Double $L$-groups and doubly-slice knots
Abstract
We develop a theory of chain complex double-cobordism for chain complexes equipped with Poincar\'{e} duality. The resulting double-cobordism groups are a refinement of Ranicki's torsion algebraic -groups for localisations of a commutative ring with involution. The refinement is analogous to the difference between metabolic and hyperbolic linking forms. We apply the double -groups in high-dimensional knot theory to define an invariant for doubly-slice -knots. We prove that the "stably doubly-slice implies doubly-slice" property holds (algebraically) for Blanchfield forms, Seifert forms and for the Blanchfield complexes of -knots for .
Keywords
Cite
@article{arxiv.1508.01048,
title = {Double $L$-groups and doubly-slice knots},
author = {Patrick Orson},
journal= {arXiv preprint arXiv:1508.01048},
year = {2017}
}
Comments
51 pages, 3 figures. Several minor modifications and improved proofs in this version. To appear in Algebraic and Geometric Topology